23.—Weak Continuity Properties of Mappings and Semigroups

J. M. Ball

doi:10.1017/s008045410000964x

Primal Lower Nice Functions in Reflexive Smooth Banach Spaces

Mathematics ◽

10.3390/math8112066 ◽

2020 ◽

Vol 8 (11) ◽

pp. 2066

Author(s):

Messaoud Bounkhel ◽

Mostafa Bachar

Keyword(s):

Banach Space ◽

Banach Spaces ◽

Hilbert Spaces ◽

Space Setting ◽

Nonlinear Anal ◽

Finite Dimensional ◽

In Trans ◽

First Time ◽

The Relationship ◽

Primal Lower Nice Functions

In the present work, we extend, to the setting of reflexive smooth Banach spaces, the class of primal lower nice functions, which was proposed, for the first time, in finite dimensional spaces in [Nonlinear Anal. 1991, 17, 385–398] and enlarged to Hilbert spaces in [Trans. Am. Math. Soc. 1995, 347, 1269–1294]. Our principal target is to extend some existing characterisations of this class to our Banach space setting and to study the relationship between this concept and the generalised V-prox-regularity of the epigraphs in the sense proposed recently by the authors in [J. Math. Anal. Appl. 2019, 475, 699–29].

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SIP Xd-frames and their perturbations in uniformly convex Banach spaces

International Journal of Wavelets Multiresolution and Information Processing ◽

10.1142/s0219691314500246 ◽

2014 ◽

Vol 12 (03) ◽

pp. 1450024

Author(s):

Xianwei Zheng ◽

Shouzhi Yang

Keyword(s):

Banach Space ◽

Banach Spaces ◽

Separable Banach Space ◽

Inner Product ◽

Uniformly Convex ◽

Atomic Decompositions ◽

Banach Frames ◽

Uniformly Convex Banach Spaces ◽

Bk Space ◽

The Relationship

In this paper, we introduce the definitions of SIP-I and SIP-II Xd-frames in a uniformly convex, separable Banach space X with respect to a BK-space Xd (here SIP represents semi-inner product), both of them are defined as sequence of elements in X. We characterize SIP-I and SIP-II Xd-frames in terms of the corresponding synthesis and analysis operators, respectively, then we consider perturbations for both of them. Furthermore, we also introduce the definitions of SIP Banach frames and SIP atomic decompositions. Under certain assumptions, we establish the relationship between SIP Banach frames and SIP atomic decompositions, and therefore obtain reconstruction formulas for every element in X and X* by using a pair of SIP-I and SIP-II Xd-frames for X. Finally, we discuss perturbations of SIP Banach frames and SIP atomic decompositions.

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Fractional vector-valued Littlewood–Paley–Stein theory for semigroups

Proceedings of the Royal Society of Edinburgh Section A Mathematics ◽

10.1017/s0308210511001302 ◽

2014 ◽

Vol 144 (3) ◽

pp. 637-667 ◽

Cited By ~ 5

Author(s):

José L. Torrea ◽

Chao Zhang

Keyword(s):

Banach Space ◽

Fractional Derivative ◽

Banach Spaces ◽

Martingale Difference ◽

Area Function ◽

Poisson Semigroup ◽

Relationship Of ◽

The Relationship ◽

Vector Valued

We consider the fractional derivative of a general Poisson semigroup. With this fractional derivative, we define the generalized fractional Littlewood–Paley g-function for semigroups acting on Lp-spaces of functions with values in Banach spaces. We give a characterization of the classes of Banach spaces for which the fractional Littlewood–Paley g-function is bounded on Lp-spaces. We show that the class of Banach spaces is independent of the order of derivation and coincides with the classical (Lusin-type/-cotype) case. We also show that the same kind of results exist for the case of the fractional area function and the fractional gλ*-function on ℝn. Finally, we consider the relationship of the almost sure finiteness of the fractional Littlewood–Paley g-function, the area function and the gλ*-function with the Lusin-cotype property of the underlying Banach space. As a byproduct of the techniques developed, one can find some results of independent interest for vector-valued Calderón–Zygmund operators. For example, one can find the following characterization: a Banach space is the unconditional martingale difference if and only if, for some (or, equivalently, for every) p ∈ [1, ∞), dy exists for almost every x ∈ ℝ and every .

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Semi-normal operators on uniformly smooth Banach spaces

Glasgow Mathematical Journal ◽

10.1017/s0017089500009356 ◽

1990 ◽

Vol 32 (3) ◽

pp. 273-276 ◽

Cited By ~ 1

Author(s):

Muneo Chō

Keyword(s):

Banach Space ◽

Linear Functional ◽

Dual Space ◽

Complex Banach Space ◽

Linear Operators ◽

Bounded Linear ◽

Uniformly Smooth ◽

Normal Operators ◽

Uniformly Smooth Banach Spaces ◽

The Relationship

In this paper we shall examine the relationship between the numerical ranges and the spectra for semi-normal operators on uniformly smooth spaces.Let X be a complex Banach space. We denote by X* the dual space of X and by B(X) the space of all bounded linear operators on X. A linear functional F on B(X) is called state if ∥F∥ = F(I) = 1. When x ε X with ∥x∥ = 1, we denoteD(x) = {f ε X*:∥f∥ = f(x) = l}.

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Entire Analytic Functions of Unbounded Type on Banach Spaces and Their Lineability

Axioms ◽

10.3390/axioms10030150 ◽

2021 ◽

Vol 10 (3) ◽

pp. 150

Author(s):

Andriy Zagorodnyuk ◽

Anna Hihliuk

Keyword(s):

Banach Space ◽

Banach Spaces ◽

Analytic Functions ◽

Entire Functions ◽

Dimensional Algebra ◽

Dimensional Banach Space ◽

Infinite Dimensional ◽

Linear Subspaces ◽

Infinite Dimensional Banach Space

In the paper we establish some conditions under which a given sequence of polynomials on a Banach space X supports entire functions of unbounded type, and construct some counter examples. We show that if X is an infinite dimensional Banach space, then the set of entire functions of unbounded type can be represented as a union of infinite dimensional linear subspaces (without the origin). Moreover, we show that for some cases, the set of entire functions of unbounded type generated by a given sequence of polynomials contains an infinite dimensional algebra (without the origin). Some applications for symmetric analytic functions on Banach spaces are obtained.

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The dual of the space of bounded operators on a Banach space

Concrete Operators ◽

10.1515/conop-2020-0109 ◽

2021 ◽

Vol 8 (1) ◽

pp. 48-59

Author(s):

Fernanda Botelho ◽

Richard J. Fleming

Keyword(s):

Banach Space ◽

Tensor Product ◽

Banach Spaces ◽

Dual Space ◽

Tensor Products ◽

Bounded Operators ◽

Projective Tensor Product ◽

Projective Tensor

Abstract Given Banach spaces X and Y, we ask about the dual space of the 𝒧(X, Y). This paper surveys results on tensor products of Banach spaces with the main objective of describing the dual of spaces of bounded operators. In several cases and under a variety of assumptions on X and Y, the answer can best be given as the projective tensor product of X ** and Y *.

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The wigner property for CL-spaces and finite-dimensional polyhedral banach spaces

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091521000250 ◽

2021 ◽

pp. 1-17

Author(s):

Dongni Tan ◽

Xujian Huang

Keyword(s):

Banach Space ◽

Banach Spaces ◽

Phase Function ◽

Linear Isometry ◽

Basic Properties ◽

Finite Dimensional ◽

Image Position

Abstract We say that a map $f$ from a Banach space $X$ to another Banach space $Y$ is a phase-isometry if the equality \[ \{\|f(x)+f(y)\|, \|f(x)-f(y)\|\}=\{\|x+y\|, \|x-y\|\} \] holds for all $x,\,y\in X$ . A Banach space $X$ is said to have the Wigner property if for any Banach space $Y$ and every surjective phase-isometry $f : X\rightarrow Y$ , there exists a phase function $\varepsilon : X \rightarrow \{-1,\,1\}$ such that $\varepsilon \cdot f$ is a linear isometry. We present some basic properties of phase-isometries between two real Banach spaces. These enable us to show that all finite-dimensional polyhedral Banach spaces and CL-spaces possess the Wigner property.

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Projections on Tree-Like banach Spaces

Canadian Journal of Mathematics ◽

10.4153/cjm-1985-049-2 ◽

1985 ◽

Vol 37 (5) ◽

pp. 908-920

Author(s):

A. D. Andrew

Keyword(s):

Banach Space ◽

Linear Operator ◽

Banach Spaces ◽

Bounded Linear Operator ◽

Unconditional Basis ◽

Reflexive Banach Space ◽

Separable Space ◽

Bounded Linear ◽

Tree Space

1. In this paper, we investigate the ranges of projections on certain Banach spaces of functions defined on a diadic tree. The notion of a “tree-like” Banach space is due to James 4], who used it to construct the separable space JT which has nonseparable dual and yet does not contain l1. This idea has proved useful. In [3], Hagler constructed a hereditarily c0 tree space, HT, and Schechtman [6] constructed, for each 1 ≦ p ≦ ∞, a reflexive Banach space, STp with a 1-unconditional basis which does not contain lp yet is uniformly isomorphic to for each n.In [1] we showed that if U is a bounded linear operator on JT, then there exists a subspace W ⊂ JT, isomorphic to JT such that either U or (1 — U) acts as an isomorphism on W and UW or (1 — U)W is complemented in JT. In this paper, we establish this result for the Hagler and Schechtman tree spaces.

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ASYMPTOTIC PROPERTIES OF KOLMOGOROV WIDTHS

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972710000043 ◽

2010 ◽

Vol 82 (1) ◽

pp. 10-17

Author(s):

MIKHAIL I. OSTROVSKII

Keyword(s):

Banach Space ◽

Asymptotic Behavior ◽

Banach Spaces ◽

Asymptotic Properties ◽

Codimension One ◽

Kolmogorov Widths

AbstractWe consider two problems concerning Kolmogorov widths of compacts in Banach spaces. The first problem is devoted to relations between the asymptotic behavior of the sequence of n-widths of a compact and of its projections onto a subspace of codimension one. The second problem is devoted to comparison of the sequence of n-widths of a compact in a Banach space 𝒴 and of the sequence of n-widths of the same compact in other Banach spaces containing 𝒴 as a subspace.

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THE POLYNOMIAL NUMERICAL INDEX OF A BANACH SPACE

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091502000810 ◽

2006 ◽

Vol 49 (1) ◽

pp. 39-52 ◽

Cited By ~ 17

Author(s):

Yun Sung Choi ◽

Domingo Garcia ◽

Sung Guen Kim ◽

Manuel Maestre

Keyword(s):

Banach Space ◽

Positive Integer ◽

Banach Spaces ◽

Compact Space ◽

Linear Operators ◽

Homogeneous Polynomials ◽

Numerical Radius ◽

Disc Algebra ◽

Multilinear Maps ◽

Numerical Index

AbstractIn this paper, we introduce the polynomial numerical index of order $k$ of a Banach space, generalizing to $k$-homogeneous polynomials the ‘classical’ numerical index defined by Lumer in the 1970s for linear operators. We also prove some results. Let $k$ be a positive integer. We then have the following:(i) $n^{(k)}(C(K))=1$ for every scattered compact space $K$.(ii) The inequality $n^{(k)}(E)\geq k^{k/(1-k)}$ for every complex Banach space $E$ and the constant $k^{k/(1-k)}$ is sharp.(iii) The inequalities$$ n^{(k)}(E)\leq n^{(k-1)}(E)\leq\frac{k^{(k+(1/(k-1)))}}{(k-1)^{k-1}}n^{(k)}(E) $$for every Banach space $E$.(iv) The relation between the polynomial numerical index of $c_0$, $l_1$, $l_{\infty}$ sums of Banach spaces and the infimum of the polynomial numerical indices of them.(v) The relation between the polynomial numerical index of the space $C(K,E)$ and the polynomial numerical index of $E$.(vi) The inequality $n^{(k)}(E^{**})\leq n^{(k)}(E)$ for every Banach space $E$.Finally, some results about the numerical radius of multilinear maps and homogeneous polynomials on $C(K)$ and the disc algebra are given.

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